Αν έχεις τύχη διάβαινε και ριζικό περπάτει
![Αποτέλεσμα εικόνας για Αν έχεις τύχη διάβαινε και ριζικό περπάτει](data:image/jpeg;base64,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)
Η παροιμία αυτή σημαίνει πως ο τυχερός άνθρωπος πάντα πετυχαίνει στη ζωή του, όποια πορεία κι αν ακολουθήσει.
Δείτε περισσότερες παροιμίες εδώ.
Για το e-didaskalia.blogspot.gr
Αποστόλης Ζυμβραγάκης
Φιλόλογος
Η παροιμία αυτή σημαίνει πως ο τυχερός άνθρωπος πάντα πετυχαίνει στη ζωή του, όποια πορεία κι αν ακολουθήσει.
Δείτε περισσότερες παροιμίες εδώ.
Για το e-didaskalia.blogspot.gr
Αποστόλης Ζυμβραγάκης
Φιλόλογος